Dioperads, Frobenius monoidal functors and duality

Abstract

Motivated by duality phenomena for derived global sections on derived local systems on compact oriented manifolds, we introduce the notion of a d-duality context between symmetric monoidal enriched categories. In this setting, the right adjoint of a symmetric monoidal functor carries compatible lax and colax structures twisted by an invertible object d. For any enriched dioperad P, we define a d-twist P\d\ and prove that, in a d-duality context, the right adjoint sends P-algebras to P\-d\-algebras. To achieve this, the key conceptual result is that Frobenius monoidal functors between symmetric monoidal categories are precisely those functors inducing morphisms between the underlying dioperads. We also develop a dioperadic Day convolution, yielding an alternative proof of the main theorem and suggesting an ∞-categorical extension of the theory.